The Fast Wandering of Slow Birds

Abstract

I study a single "slow" bird moving with a flock of birds of a different, and faster (or slower) species. I find that every "species" of flocker has a characteristic speed γ v0, where v0 is the mean speed of the flock, such that, if the speed vs of the "slow" bird equals γ, it will randomly wander transverse to the mean direction of flock motion far faster than the other birds will: its mean-squared transverse displacement will grow in d=2 with time t like t5/3, in contrast to t4/3 for the other birds. In d=3, the slow bird's mean squared transverse displacement grows like t5/4, in contrast to t for the other birds. If vs≠ γ, the mean-squared displacement of the "slow" bird crosses over from t5/2 to t4/3 scaling in d=2, and from t5/4 to t scaling in d=3, at a time tc that scales according to tc |vs-γ|-2.